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The Pi-Quadratic Equation
I was thinking about what to write in next,then,I think 🤔 I will solve Pi(π)-Quadratic Equation which was got from my previous celebrated likes (23K) 😍, and,number of stories (33).
Here,You will see,23=7π+1,and,π²=10(nearly equal 😌,or,You can google it why it is nearly equal)...
So,now,I got number of stories as 33=23+10=7π+1+π²
(here, simply puts ,"7π+1" in place of "23" and puts "π²" in place of "10".)
Therefore,π²+7π+1=33... (Equation-1)
After solving Equation-1,we get,
π²+7π-32=0...which is a quadratic equation 😍 but with Pi(or,π)😌 variable instead of letter x which is commonly used to show quadratic equation,or, mathematically represented as "ax²+bx+c=0".
In the normal 😁 quadratic equation,We don't know that what We will be obtained by us in form of two zeroes, example,X1 and X2,but,here We have x=π,so, 🙃 one of zerose will be equal or equivalent to 3.14,
So, let's start from here,
Here,main equation is,π²+7π-32=0
where,a(coefficient of π²)=1,b(coefficient of π)=7,and,c=-32,
Here,We will be use a quadratic formula for finding two solutions...
Quadratic formula for finding two zeroes,X1 and X2:-
x=(-b±√D)/(2a),
where,D=b²-4ac
Apply formula on quadratic equation,
X1=(-b+√D)/2a
=(-7+√177)/2(1)
=6.304/2
=3.152[Acceptable positive value of Pi (π)].
X2=(-b-√D)/2a=(-7-√177)/2(1)
=−20.304/2
=−10.152[unacceptable value because value of Pi (or,π) never comes as negative-value unless it multiplied by -1 for making -Pi(or,-π)].
Fantastico,Wow😳... it's working...
X1=3.152 is acceptable positive value which is similar to value of π=3.14,and,if You want floating numbers after 3.152......,then,You will need 🤔 to calculate (-7+√177)/2, because,here I can't show you more numbers 🔢 after decimal, because,this app consider long numbers as mobile 📲 number,so, according to rules,it is impossible,but,I can only write as X1=3.152.
But,here,Good thing 🤔 is that if You calculate π-(-7+√177)/2=(22/7)-(-7+√177)/2=0.01,
Then,You will find difference is 0.01 that indirectly calls that "(-7+√177)/2" is nearly equal 😌 to Pi (or,π).
Thanks 😊 for reading this,
Bye-Bye🥱 Cute 🥺 Public,
see 🙈 you soon 🔜 later 😁🙃😌!
#abdsto #laistory #abdmaths #Pi #Ramanujan
© Abdul Ahad GujBihari
Here,You will see,23=7π+1,and,π²=10(nearly equal 😌,or,You can google it why it is nearly equal)...
So,now,I got number of stories as 33=23+10=7π+1+π²
(here, simply puts ,"7π+1" in place of "23" and puts "π²" in place of "10".)
Therefore,π²+7π+1=33... (Equation-1)
After solving Equation-1,we get,
π²+7π-32=0...which is a quadratic equation 😍 but with Pi(or,π)😌 variable instead of letter x which is commonly used to show quadratic equation,or, mathematically represented as "ax²+bx+c=0".
In the normal 😁 quadratic equation,We don't know that what We will be obtained by us in form of two zeroes, example,X1 and X2,but,here We have x=π,so, 🙃 one of zerose will be equal or equivalent to 3.14,
So, let's start from here,
Here,main equation is,π²+7π-32=0
where,a(coefficient of π²)=1,b(coefficient of π)=7,and,c=-32,
Here,We will be use a quadratic formula for finding two solutions...
Quadratic formula for finding two zeroes,X1 and X2:-
x=(-b±√D)/(2a),
where,D=b²-4ac
Apply formula on quadratic equation,
X1=(-b+√D)/2a
=(-7+√177)/2(1)
=6.304/2
=3.152[Acceptable positive value of Pi (π)].
X2=(-b-√D)/2a=(-7-√177)/2(1)
=−20.304/2
=−10.152[unacceptable value because value of Pi (or,π) never comes as negative-value unless it multiplied by -1 for making -Pi(or,-π)].
Fantastico,Wow😳... it's working...
X1=3.152 is acceptable positive value which is similar to value of π=3.14,and,if You want floating numbers after 3.152......,then,You will need 🤔 to calculate (-7+√177)/2, because,here I can't show you more numbers 🔢 after decimal, because,this app consider long numbers as mobile 📲 number,so, according to rules,it is impossible,but,I can only write as X1=3.152.
But,here,Good thing 🤔 is that if You calculate π-(-7+√177)/2=(22/7)-(-7+√177)/2=0.01,
Then,You will find difference is 0.01 that indirectly calls that "(-7+√177)/2" is nearly equal 😌 to Pi (or,π).
Thanks 😊 for reading this,
Bye-Bye🥱 Cute 🥺 Public,
see 🙈 you soon 🔜 later 😁🙃😌!
#abdsto #laistory #abdmaths #Pi #Ramanujan
© Abdul Ahad GujBihari
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